Mathematics Worksheet/Equations of Straight Line

Determine the gradient of a segment in line that connecting points:
1. $\!X=(\!4,\!2)$ and $\!Y=(\!-3,\!-4)$
2. $\!A=(\!-5,\!-2)$ and $\!B=(\!3,\!4)$
3. $\alpha =(\!5,\!-3)$ and $\beta =(\!-2,\!8)$
4. $\lambda =(\!-6,\!3)$ and $\Delta =(\!4,\!1)$
5. $\!P=(\!-4,\!7)$ and $\!Q=(\!6,\!-3)$
6. $\!E=(\!7,\!5)$ and $\!F=(\!4,\!6)$
7. $\kappa =(\!-5,\!-2)$ and $\Omega =(\!-4,\!-9)$
8. $\!M=(\!-3,\!4)$ and $\!N=(\!5,\!-6)$
9. $\!R=(\!-5,\!1)$ and $\!S=(\!-4,\!-10)$
10. $\!C=(\!3,\!-5)$ and $\!D=(\!5,\!-3)$
Find the gradient line from:
1. $\!x+\!y=\!14$
2. $\!3x-\!5y=\!11$
3. $\!5x+\!4y=\!41$
4. $\!x-\!y=\!15$
5. $\!3(\!2x+\!5y)=\!3$
6. $\!5x-\!y=\!18$
7. $\!6x+\!3y=\!62$
8. $\!10x-\!5y=\!75$
9. $\!7x+\!3y=\!-8$
10. $\!3x-\!5y=\!-30$
11. $\!5x+\!9y=\!-2$
12. $\!4x+\!y=\!0$
13. $\!6x-\!3y=\!0$
14. $\!4(\!3x+\!y)=\!8$
15. $\!2x-\!0,5y=\!-7$
16. $\!1,5x+\!2,5y=\!21$
17. $\!2,4x+\!1,5y=\!14,7$
18. $\!3,2x-\!2,3y=\!5$
19. $\!4,5x+\!2,7y=\!18,9$
20. $\!6,7x-\!1,9y=\!19,2$
Draw in the Cartesian diagram if known the four points are:
1. $\!A=\!(\!4,\!-2),\!B=\!(\!3,\!3),\!C=\!(\!-6,\!3),\!D=\!(\!5,\!4)$
2. $\!A=\!(\!-7,\!-1),\!B=\!(\!4,\!-2),\!C=\!(\!-1,\!-9),\!D=\!(\!-4,\!3)$
3. $\!A=\!(\!-5,\!5),\!B=\!(\!6,\!-6),\!C=\!(\!-3,\!3),\!D=\!(\!2,\!-2)$
4. $\!A=\!(\!1,\!-10),\!B=\!(\!-3,\!-6),\!C=\!(\!4,\!7),\!D=\!(\!-6,\!1)$
5. $\!A=\!(\!-2,\!-2),\!B=\!(\!-5,\!7),\!C=\!(\!1,\!3),\!D=\!(\!-9,\!5)$
From the questions number 3, calculate the gradient of line AB and line CD.
From the questions number 3, are the both lines parallel? If not, give the reason.